Mathematical analysis of population growth subject to environmental change
Many ecosystems are pressured when the environment is perturbed, such as when resources are scarce, or even when they are over-abundant. Changes in the environment impact on its ability to support a population of a given species. However, most current models do not take the changing environment i...
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Main Author: | |
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Format: | Thesis |
Language: | English |
Published: |
2014
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Subjects: | |
Online Access: | http://eprints.uthm.edu.my/10794/1/24p%20HAMIZAH%20MOHD%20SAFUAN.pdf http://eprints.uthm.edu.my/10794/ |
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Summary: | Many ecosystems are pressured when the environment is perturbed, such as when
resources are scarce, or even when they are over-abundant. Changes in the environment
impact on its ability to support a population of a given species. However,
most current models do not take the changing environment into consideration. The
standard approach in modelling a population in its environment is to assume that
the carrying capacity, which is a proxy for the state of the environment, is unchanging.
In e�ect, the assumption also posits that the population is negligible
compared to the environment and cannot alter the carrying capacity in any way.
Thus, modelling the interplay of the population with its environments is important
to describe varying factors that exist in the system. This objective can be achieved
by treating the carrying capacity as time- and space-dependent variables in the
governing equations of the model. Thereby, any changes to the environment can be
naturally re
ected in the survival, movement and competition of the species within
the ecosystem.
In this thesis, detailed investigations of several mathematical models for population
growth are presented. Formulating the carrying capacity as being time-dependent
was the fundamental approach used to describe a varying environment which resulted
in investigating a non-autonomous equation. This approach led to developing
models that directly couple the dynamics of one or two species with their environments.
To attain this, the carrying capacity was modelled as a state-variable. In
these models, the ultimate state for the ecosystem depends on the resource enrichment
parameter that was found to have signi�cant impact on the growth of a
population, leading to either coexistence or extinction of a particular species. Other
dynamical behaviours including oscillations in population have also been found to
exist.
Varying the carrying capacity has given a better understanding of population growth
when subjected to environmental change. This thesis serves as another platform
for ecologists and biologists to investigate further the importance of a varying environment,
and could be applied in future population-growth studies. |
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